Computability properties of hyperbolic complex Hénon maps

Abstract

In this article, we provide the first theoretical framework guaranteeing that computers can, in principle, be used to analyze the parameter space of complex Hémaps. More precisely, we obtain computability results for hyperbolic polynomial diffeomorphisms of C2, for which Hénon maps are prototypical examples. Specifically, we establish computability of the Julia set for hyperbolic maps, semi-decidability of hyperbolicity, and lower computability of the hyperbolicity locus in the parameter space of generalized Hénon mappings of fixed degree at least two. Our approach builds upon techniques developed in our's recent previous works on polynomial maps of C and polynomial skew products of C2. In the setting of polynomial diffeomorphisms of C2, however, establishing hyperbolicity for the Julia set is considerably more difficult, as it requires identifying unstable (and stable) cone fields that are preserved and expanded by Df (respectively Df-1), and also due to the lack of algorithmically detectable quantitative shadowing.